This article was initially an appendix in our Reactive Programming with RxJava book. However, an introduction to monads, albeit very much related to reactive programming, didn't suit that very well. So I decided to take it out and publish this separately as a blog post. I am aware that "my very own, half correct and half complete explanation of monads" is the new "Hello, world" on programming blogs. Yet the article looks at functors and monads from a specific angle of Java data structures and libraries. Thus I thought it's worthwhile to share.

RxJava was designed and built on top of very fundamental concepts like functors, monoids, and monads. Even though Rx was modeled initially for imperative C# language and we are learning about RxJava, working on top of a similarly imperative language, the library has its roots in functional programming. You should not be surprised after you realize how compact the RxJava API is. There are pretty much just a handful of core classes, typically immutable, and everything is composed using mostly pure functions.

With a recent rise of functional programming (or functional style), most commonly expressed in modern languages like Scala or Clojure, monads became a widely discussed topic. There is a lot of folklore around them:

A monad is a monoid in the category of endofunctors, what's the problem?

The vast majority of programmers, especially those without a functional programming background, tend to believe monads are some arcane computer science concept, so theoretical that it can not possibly help in their programming career. This negative perspective can be attributed to dozens of articles and blog posts being either too abstract or too narrow. But it turns out that monads are all around us, even in a standard Java library, especially since Java Development Kit (JDK) 8 (more on that later). What is absolutely brilliant is that once you understand monads for the first time, suddenly several unrelated classes and abstractions, serving entirely different purposes, become familiar.

Monads generalize various seemingly independent concepts so that learning yet another incarnation of monad takes very little time. For example, you do not have to learn how CompletableFuture works in Java 8 - once you realize it is a monad, you know precisely how it works and what can you expect from its semantics. And then you hear about RxJava which sounds so much different but because Observable is a monad, there is not much to add. There are numerous other examples of monads you already came across without knowing that. Therefore, this section will be a useful refresher even if you fail to actually use RxJava.

Functors

Before we explain what a monad is, let's explore simpler construct called a functor . A functor is a typed data structure that encapsulates some value(s). From a syntactic perspective a functor is a container with the following API:

But mere syntax is not enough to understand what a functor is. The only operation that functor provides is map() that takes a function f. This function receives whatever is inside a box, transforms it and wraps the result as-is into a second functor. Please read that carefully. Functor<T> is always an immutable container, thus map never mutates the original object it was executed on. Instead, it returns the result (or results - be patient) wrapped in a brand new functor, possibly of different type R. Additionally functors should not perform any actions when identity function is applied, that is map(x -> x). Such a pattern should always return either the same functor or an equal instance.

Often Functor<T> is compared to a box holding instance of T where the only way of interacting with this value is by transforming it. However, there is no idiomatic way of unwrapping or escaping from the functor. The value(s) always stay within the context of a functor. Why are functors useful? They generalize multiple common idioms like collections, promises, optionals, etc. with a single, uniform API that works across all of them. Let me introduce a couple of functors to make you more fluent with this API:

An extra F type parameter was required to make Identity compile. What you saw in the preceding example was the simplest functor just holding a value. All you can do with that value is transforming it inside map method, but there is no way to extract it. This is considered beyond the scope of a pure functor. The only way to interact with functor is by applying sequences of type-safe transformations:

Why would you even bother with such verbose wrapping that not only does not provide any added value, but also is not capable of extracting the contents back? Well, it turns out you can model several other concepts using this raw functor abstraction. For example starting from Java 8 Optional is a functor with the map() method. Let us implement it from scratch:

Now it becomes interesting. An FOptional<T> functor may hold a value, but just as well it might be empty. It's a type-safe way of encoding null. There are two ways of constructing FOptional - by supplying a value or creating an empty() instance. In both cases, just like with Identity,FOptional is immutable and we can only interact with the value from inside. What differsFOptional is that the transformation function f may not be applied to any value if it is empty. This means functor may not necessarily encapsulate exactly one value of type T. It can just as well wrap an arbitrary number of values, just like List... functor:

The API remains the same: you take a functor in a transformation - but the behavior is much different. Now we apply a transformation on each and every item in the FList, declaratively transforming the whole list. So if you have a list of customers and you want a list of their streets, it's as simple as:

It's no longer as simple as saying customers.getAddress().street(), you can't invokegetAddress() on a collection of customers, you must invoke getAddress() on each individual customer and then place it back in a collection. By the way, Groovy found this pattern so common that it actually has a syntax sugar for that: customer*.getAddress()*.street(). This operator, known as spread-dot, is actually a map in disguise. Maybe you are wondering why I iterate over list manually inside map rather than using Streams from Java 8:list.stream().map(f).collect(toList())? Does this ring a bell? What if I told youjava.util.stream.Stream<T> in Java is a functor as well? And by the way, also a monad?

Now you should see the first benefits of functors - they abstract away the internal representation and provide consistent, easy to use API over various data structures. As the last example let me introduce the promise functor, similar to Future. Promise "promises" that a value will become available one day. It is not yet there, maybe because some background computation was spawned or we are waiting for an external event. But it will appear sometime in the future. The mechanics of completing aPromise<T> are not interesting, but the functor nature is:

Looks familiar? That is the point! The implementation of the functor is beyond the scope of this article and not even important. Enough to say that we are very close to implementing CompletableFuture from Java 8 and we almost discovered Observable from RxJava. But back to functors. Promise<Customer> does not hold a value of Customer just yet. It promises to have such value in the future. But we can still map over such functor, just like we did with FOptional and FList - the syntax and semantics are exactly the same. The behavior follows what the functor represents. Invoking customer.map(Customer::getAddress) yields Promise<Address>, which means map is non-blocking. customer.map() will customer promise to complete. Instead, it returns another promise, of a different type. When upstream promise completes, downstream promise applies a function passed to map() and passes the result downstream. Suddenly our functor allows us to pipeline asynchronous computations in a non-blocking manner. But you do not have to understand or learn that - because Promise is a functor, it must follow syntax and laws.

There are many other great examples of functors, for example representing value or error in a compositional manner. But it is high time to look at monads.

From Functors to Monads

I assume you understand how functors work and why are they a useful abstraction. But functors are not that universal as one might expect. What happens if your transformation function (the one passed as an argument to map()) returns functor instance rather than simple value? Well, a functor is just a value as well, so nothing bad happens. Whatever was returned is placed back in a functor so all behaves consistently. However imagine you have this handy method for parsing Strings:

Exceptions are side-effects that undermine type system and functional purity. In pure functional languages, there is no place for exceptions. After all, we never heard about throwing exceptions during math classes, right? Errors and illegal conditions are represented explicitly using values and wrappers. For example tryParse() takes a String but does not simply return an int or silently throw an exception at runtime. We explicitly tell, through the type system, that tryParse() can fail, there is nothing exceptional or erroneous in having a malformed string. This semi-failure is represented by an optional result. Interestingly Java has checked exceptions, the ones that must be declared and handled, so in some sense, Java is purer in that regard, it does not hide side-effects. But for better or worse checked exceptions are often discouraged in Java, so let's get back to tryParse(). It seems useful to compose tryParse with String already wrapped in FOptional:

That should not come as a surprise. If tryParse() would return an int you would getFOptional<Integer> num, but because map() function returns FOptional<Integer> itself, it gets wrapped twice into awkward FOptional<FOptional<Integer>>. Please look carefully at the types, you must understand why we got this double wrapper here. Apart from looking horrible, having a functor in functor ruins composition and fluent chaining:

Here we try to map over the contents of FOptional by turning int into +Date+. Having a function of int -> Date we can easily transform from Functor<Integer> to Functor<Date>, we know how it works. But in case of num2 the situation becomes complicated. What num2.map()receives as input is no longer an int but an FOoption<Integer> and obviouslyjava.util.Date does not have such a constructor. We broke our functor by double wrapping it. However having a function that returns a functor rather than simple value is so common (liketryParse()) that we can not simply ignore such requirement. One approach is to introduce a special parameterless join() method that "flattens" nested functors:

FOptional<Integer> num3 = num2.join()

It works but because this pattern is so common, special method named flatMap() was introduced. flatMap() is very similar to map but expects the function received as an argument to return a functor - or monad to be precise:

We simply concluded that flatMap is just a syntactic sugar to allow better composition. ButflatMap method (often called bind or >>= from Haskell) makes all the difference since it allows complex transformations to be composed in a pure, functional style. If FOptional was an instance of monad, parsing suddenly works as expected:

Monads do not need to implement map, it can be implemented on top of flatMap() easily. As a matter of fact flatMap is the essential operator that enables a whole new universe of transformations. Obviously just like with functors, syntactic compliance is not enough to call some class a monad, the flatMap() operator has to follow monad laws, but they are fairly intuitive like associativity of flatMap() and identity. The latter requires that m(x).flatMap(f) is the same asf(x) for any monad holding a value x and any function f. We are not going to dive too deep into monad theory, instead let's focus on practical implications. Monads shine when their internal structure is not trivial, for example Promise monad that will hold a value in the future. Can you guess from the type system how Promise will behave in the following program? First, all methods that can potentially take some time to complete return a Promise:

This becomes interesting. flatMap() must preserve monadic type therefore all intermediate objects are Promises. It is not just about keeping the types in order - preceding program is suddenly fully asynchronous! loadCustomer() returns a Promise so it does not block. readBasket() takes whatever the Promise has (will have) and applies a function returning another Promise and so on and so forth. Basically, we built an asynchronous pipeline of computation where the completion of one step in the background automatically triggers next step.

Exploring flatMap()

It is very common to have two monads and combining the value they enclose together. However, both functors and monads do not allow direct access to their internals, which would be impure. Instead, we must carefully apply transformation without escaping the monad. Imagine you have two monads and you want to combine them:

Please take your time to study the preceding pseudo-code. I don't use any real monad implementation like Promise or List to emphasize the core concept. We have two independent monads, one of type Month and the other of type Integer. In order to build LocalDate out of them, we must build a nested transformation that has access to the internals of both monads. Work through the types, especially making sure you understand why we use flatMap in one place andmap() in the other. Think how you would structure this code if you had a third Monad<Year> as well. This pattern of applying a function of two arguments (m and d in our case) is so common that in Haskell there is special helper function called liftM2 that does exactly this transformation, implemented on top of map and flatMap. In Java pseudo-syntax it would look somewhat like this:

You don't have to implement this method for every monad, flatMap() is enough, moreover, it works consistently for all monads. liftM2 is extremely useful when you consider how it can be used with various monads. For example, listM2(list1, list2, function) will apply function on every possible pair of items from list1 and list2 (Cartesian product). On the other hand, for optionals it will apply a function only when both optionals are non-empty. Even better, for a Promise monad a function will be executed asynchronously when both Promises are completed. This means we just invented a simple synchronization mechanism (join() in fork-join algorithms) of two asynchronous steps.

Another useful operator that we can easily build on top of flatMap() is filter(Predicate<T>)which takes whatever is inside a monad and discards it entirely if it does not meet certain predicate. In a way, it is similar to map but rather than 1-to-1 mapping we have 1-to-0-or-1. Again filter()has the same semantics for every monad but quite amazing functionality depending on which monad we actually use. Obviously, it allows filtering out certain elements from a list:

FList<Customer> vips =
customers.filter(c -> c.totalOrders > 1_000);

But it works just as well e.g. for optionals. In that case, we can transform non-empty optional into an empty one if the contents of the optional do not meet some criteria. Empty optionals are left intact.

From List of Monads to Monad of List

Another useful operator that originates from flatMap() is sequence(). You can easily guess what it does simply by looking at type signature:

Monad<Iterable<T>> sequence(Iterable<Monad<T>> monads)

Often we have a bunch of monads of the same type and we want to have a single monad of a list of that type. This might sound abstract to you, but it is impressively useful. Imagine you wanted to load a few customers from the database concurrently by ID so you used loadCustomer(id) method several times for different IDs, each invocation returning Promise<Customer>. Now you have a list of Promises but what you really want is a list of customers, e.g. to be displayed in the web browser. The sequence() (in RxJava sequence() is called concat() or merge(), depending on use-case) operator is built just for that:

Having an FList<Integer> representing customer IDs we map over it (do you see how it helps that FList is a functor?) by calling database.loadCustomer(id) for each ID. This leads to a rather inconvenient list of Promises. sequence() saves the day, but once again this is not just a syntactic sugar. The preceding code is fully non-blocking. For different kinds of monads sequence() still makes sense, but in a different computational context. For example, it can change FList<FOptional<T>> into FOptional<FList<T>>. And by the way, you can implementsequence() (just like map()) on top of flatMap().

This is just the tip of the iceberg when it comes to the usefulness of flatMap() and monads in general. Despite coming from rather an obscure category theory, monads proved to be extremely useful abstraction even in object-oriented programming languages such as Java. Being able to compose functions returning monads is so universally helpful that dozens of unrelated classes follow monadic behavior.

Moreover, once you encapsulate data inside a monad, it is often hard to get it out explicitly. Such an operation is not part of the monad behavior and often leads to non-idiomatic code. For example, Promise.get() on Promise<T> can technically return T, but only by blocking, whereas all operators based on flatMap() are non-blocking. Another example is FOptional.get(), but that can fail because FOptional may be empty. Even FList.get(idx) that peeks particular element from a list sounds awkward because you can replace for loops with map() quite often.

I hope you now understand why monads are so popular these days. Even in an object-oriented(-ish) language like Java, they are quite a useful abstraction.